Boundary value problems in Lipschitz domains for equations with lower order coefficients

Abstract

We use the method of layer potentials to study the R2 Regularity problem and the D2 Dirichlet problem for second order elliptic equations of the form Lu=0, with lower order coefficients, in bounded Lipschitz domains. For R2 we establish existence and uniqueness assuming that L is of the form Lu=-div(A∇ u+bu)+c∇ u+du, where the matrix A is uniformly elliptic and H\"older continuous, b is H\"older continuous, and c,d belong to Lebesgue classes and they satisfy either the condition d≥divb, or d≥divc in the sense of distributions. In particular, A is not assumed to be symmetric, and there is no smallness assumption on the norms of the lower order coefficients. We also show existence and uniqueness for D2 for the adjoint equations Ltu=0.